1. f(x) = ∫ (x-t)e^(-t^2)dt = ∫ xe^(-t^2)dt - ∫ te^(-t^2)dt = x∫ e^(-t^2)dt - ∫ te^(-t^2)dt (对 t 积分,x相对于常量,可提到积分号外) f'(x) = ∫ e^(-t^2)dt + xe^(-x^2) - xe^(-x^2) = ∫ e^(-t^2)dt df(x) = f'(x)dx = [∫ e^(-t^2)dt] dx 2. dy/dx = y'/x' = 3t^2/(2t) = (3/2)t, t = 2 时, 切线斜率 k = (3/2)t = 3,切点 (5,8), 切线方程 y-8 = 3(x-5), 即 3x-y-7 = 0
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